We study the model theory of fields $k$ carrying a henselian valuation with real closed residue field. We give a criteria for elementary equivalence and elementary inclusion of such fields involving the value group of a not necessarily definable valuation. This allows us to translate theories of such fields to theories of ordered abelian groups, and we study the properties of this translation. We also characterize the first-order definable convex subgroups of a given ordered abelian group and prove that the definable real valuation rings of $k$ are in correspondence with the definable convex subgroups of the value group of a certain real valuation of $k$.
Publié le : 1996-12-14
Classification:
Henselian fields,
real closed fields,
ordered abelian groups,
decidability,
03C30,
12D15,
12J10,
60F20,
03B25
@article{1183745127,
author = {Delon, Francoise and Farre, Rafel},
title = {Some Model Theory for Almost Real Closed Fields},
journal = {J. Symbolic Logic},
volume = {61},
number = {1},
year = {1996},
pages = { 1121-1152},
language = {en},
url = {http://dml.mathdoc.fr/item/1183745127}
}
Delon, Francoise; Farre, Rafel. Some Model Theory for Almost Real Closed Fields. J. Symbolic Logic, Tome 61 (1996) no. 1, pp. 1121-1152. http://gdmltest.u-ga.fr/item/1183745127/